Related papers: Stochastic Optimization Algorithms for Instrumental Variable Regression with Streaming Data

Stochastic Optimization Algorithms for Instrumental Variable Regression with Streaming Data

URL: http://arxiv.org/abs/2405.19463v1
Date: Wed, 29 May 2024 19:21:55 GMT
Title: Stochastic Optimization Algorithms for Instrumental Variable Regression with Streaming Data
Authors: Xuxing Chen, Abhishek Roy, Yifan Hu, Krishnakumar Balasubramanian,
Abstract summary: We develop and analyze algorithms for instrumental variable regression by viewing the problem as a conditional optimization problem. In the context of least-squares instrumental variable regression, our algorithms neither require matrix inversions nor mini-batches. We derive rates of convergence in expectation, that are of order $mathcalO(log T/T)$ and $mathcalO (1/T1-iota)$ for any $iota>0$.
Score: 17.657917523817243
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We develop and analyze algorithms for instrumental variable regression by viewing the problem as a conditional stochastic optimization problem. In the context of least-squares instrumental variable regression, our algorithms neither require matrix inversions nor mini-batches and provides a fully online approach for performing instrumental variable regression with streaming data. When the true model is linear, we derive rates of convergence in expectation, that are of order $\mathcal{O}(\log T/T)$ and $\mathcal{O}(1/T^{1-\iota})$ for any $\iota>0$, respectively under the availability of two-sample and one-sample oracles, respectively, where $T$ is the number of iterations. Importantly, under the availability of the two-sample oracle, our procedure avoids explicitly modeling and estimating the relationship between confounder and the instrumental variables, demonstrating the benefit of the proposed approach over recent works based on reformulating the problem as minimax optimization problems. Numerical experiments are provided to corroborate the theoretical results.

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